If the function `f(x)=(t+3x-x^(2))/(x-4),` where is a parameter, has a minimum and a maximum, then the greatest value of t is ….. .

If f(x)=(t+3x-x^(2))/(x-4), where t is a parameter that has minimum and maximum,then the range of values of t is (0,4)(b)(0,oo)(-oo,4)(d)(4,oo)

The function f(x)=x^(2)e^(x) has minimum value

The function f(x)=x^(2)e^(x) has maximum value

Let f(x)=(x^(2)+2)/([x]),1 le x le3 , where [.] is the greatest integer function. Then the least value of f(x) is

The function f(x)=x^(2), x in R has no maximum value.

If the function f(x)=a/x+x^2 has a maximum at x=-3 then a=

Consider the function f(x)=(x^(2)-1)/(x^(2)+1), where x in R. At what value of x does f(x) attain minimum value? What is the minimum value of f(x)?

In(-4,4) the function f(x)=int_(-10)^(x)(t^(4)-4)e^(-4t)dt has